Take x and y to be integers.
If we have a set P(m) comprising the first m primes beneath a value z, and
a
general subset J of of P(m), then I am constructing a matrix M_1 in which
the members of J index the rows.
I am also constructing an array M_[x,y] comprising black cells and white
cells. The number of black cells in a column is given by t(n,M_[x,y]).
Will
it be acceptable in a mathematical paper to devise a form of notation
referencing an interval [x,y] in such a way that the values of
t(n,M_[x,y])
over [x,y] conform precisely to the divisibility distribution that is
exhibited in an interval [x,y] M_1?
I was thinking that, for a value of t, it would given by t(n,M_[x,y],J).
But someone was telling me that this mixture of arguments is something
that
is just not done....
Any ideas as to how to lay this one out for the reader? -- I am not
trained
in this field.
With thanks in advance.
|
